Radius 2 given Rotational Frequency Solution

STEP 0: Pre-Calculation Summary
Formula Used
Radius of Mass 2 = Velocity of Particle with Mass m2/(2*pi*Rotational Frequency)
R2 = v2/(2*pi*νrot)
This formula uses 1 Constants, 3 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Variables Used
Radius of Mass 2 - (Measured in Meter) - Radius of Mass 2 is a distance of mass 2 from the center of mass.
Velocity of Particle with Mass m2 - (Measured in Meter per Second) - Velocity of Particle with Mass m2 is the rate at which particle (of mass m2) moves.
Rotational Frequency - (Measured in Hertz) - Rotational Frequency is defined as the number of rotations per unit time or reciprocal of the time period of one complete rotation.
STEP 1: Convert Input(s) to Base Unit
Velocity of Particle with Mass m2: 1.8 Meter per Second --> 1.8 Meter per Second No Conversion Required
Rotational Frequency: 10 Hertz --> 10 Hertz No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
R2 = v2/(2*pi*νrot) --> 1.8/(2*pi*10)
Evaluating ... ...
R2 = 0.0286478897565412
STEP 3: Convert Result to Output's Unit
0.0286478897565412 Meter -->2.86478897565412 Centimeter (Check conversion ​here)
FINAL ANSWER
2.86478897565412 2.864789 Centimeter <-- Radius of Mass 2
(Calculation completed in 00.020 seconds)

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Created by Nishant Sihag
Indian Institute of Technology (IIT), Delhi
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National Institute of Information Technology (NIIT), Neemrana
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Reduced Mass and Radius of Diatomic Molecule Calculators

Mass 1 of Diatomic Molecule
​ LaTeX ​ Go Mass 1 of Diatomic Molecule = Mass 2*Radius of Mass 2/Radius of Mass 1
Mass 2 of Diatomic Molecule
​ LaTeX ​ Go Mass 2 of Diatomic Molecule = Mass 1*Radius of Mass 1/Radius of Mass 2
Radius 2 of Rotation
​ LaTeX ​ Go Radius 1 given Rotational Frequency = Mass 1*Radius of Mass 1/Mass 2
Radius 1 of Rotation
​ LaTeX ​ Go Radius 1 of Rotation = Mass 2*Radius of Mass 2/Mass 1

Reduced Mass and Radius of Diatomic Molecule Calculators

Mass 2 given Moment of Inertia
​ LaTeX ​ Go Mass 2 given Moment of Inertia = (Moment of Inertia-(Mass 1*Radius of Mass 1^2))/Radius of Mass 2^2
Mass 1 given Moment of Inertia
​ LaTeX ​ Go Mass2 of object1 = (Moment of Inertia-(Mass 2*Radius of Mass 2^2))/Radius of Mass 1^2
Mass 1 of Diatomic Molecule
​ LaTeX ​ Go Mass 1 of Diatomic Molecule = Mass 2*Radius of Mass 2/Radius of Mass 1
Mass 2 of Diatomic Molecule
​ LaTeX ​ Go Mass 2 of Diatomic Molecule = Mass 1*Radius of Mass 1/Radius of Mass 2

Radius 2 given Rotational Frequency Formula

​LaTeX ​Go
Radius of Mass 2 = Velocity of Particle with Mass m2/(2*pi*Rotational Frequency)
R2 = v2/(2*pi*νrot)

How to get Radius 2 when rotational frequency is given?

We know linear velocity (v) is radius(r) times the angular velocity (ω) {i.e. v=r*ω} ,and angular velocity (ω) is equal to the product of the rotational frequency (f) and the constant 2pi {ω= 2*pi* f} . So considering these two relations give us a simple relation of radius {i.e. r= velocity/(2*pi*f) } and thus we obtain Radius 2.

How to Calculate Radius 2 given Rotational Frequency?

Radius 2 given Rotational Frequency calculator uses Radius of Mass 2 = Velocity of Particle with Mass m2/(2*pi*Rotational Frequency) to calculate the Radius of Mass 2, The Radius 2 given rotational frequency formula is defined to relate radius with velocity and rotational frequency. The linear velocity is the radius times the angular velocity and further the relation of angular velocity with frequency (angular velocity = 2*pi* frequency). So by these equations, the radius is velocity divided by (2 * pi times Rotational frequency). Radius of Mass 2 is denoted by R2 symbol.

How to calculate Radius 2 given Rotational Frequency using this online calculator? To use this online calculator for Radius 2 given Rotational Frequency, enter Velocity of Particle with Mass m2 (v2) & Rotational Frequency rot) and hit the calculate button. Here is how the Radius 2 given Rotational Frequency calculation can be explained with given input values -> 286.4789 = 1.8/(2*pi*10).

FAQ

What is Radius 2 given Rotational Frequency?
The Radius 2 given rotational frequency formula is defined to relate radius with velocity and rotational frequency. The linear velocity is the radius times the angular velocity and further the relation of angular velocity with frequency (angular velocity = 2*pi* frequency). So by these equations, the radius is velocity divided by (2 * pi times Rotational frequency) and is represented as R2 = v2/(2*pi*νrot) or Radius of Mass 2 = Velocity of Particle with Mass m2/(2*pi*Rotational Frequency). Velocity of Particle with Mass m2 is the rate at which particle (of mass m2) moves & Rotational Frequency is defined as the number of rotations per unit time or reciprocal of the time period of one complete rotation.
How to calculate Radius 2 given Rotational Frequency?
The Radius 2 given rotational frequency formula is defined to relate radius with velocity and rotational frequency. The linear velocity is the radius times the angular velocity and further the relation of angular velocity with frequency (angular velocity = 2*pi* frequency). So by these equations, the radius is velocity divided by (2 * pi times Rotational frequency) is calculated using Radius of Mass 2 = Velocity of Particle with Mass m2/(2*pi*Rotational Frequency). To calculate Radius 2 given Rotational Frequency, you need Velocity of Particle with Mass m2 (v2) & Rotational Frequency rot). With our tool, you need to enter the respective value for Velocity of Particle with Mass m2 & Rotational Frequency and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Radius of Mass 2?
In this formula, Radius of Mass 2 uses Velocity of Particle with Mass m2 & Rotational Frequency. We can use 2 other way(s) to calculate the same, which is/are as follows -
  • Radius of Mass 2 = Mass 1*Bond Length/(Mass 1+Mass 2)
  • Radius of Mass 2 = Mass 1*Bond Length/(Mass 1+Mass 2)
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